Reconstruction, Thermodynamics and Stability of Model in f(T,T) Gravity

Abstract

We reconstruct the model for f(T,T) Theory, where T is the torsion scalar and T the trace of the energy-momentum tensor. The result shows that the action of is a combination of a linear term, a constant (-2) and a non-linear term given by the product -TFg[(T1/3/16π G)(16π GT+T+8)], with Fg being a generic function. We show that to maintain conservation of energy-momentum tensor should impose that Fg[y] must be linear on the trace T. This reconstruction decays in the f(T) Theory for Fg Q, with Q a constant. Our reconstruction describes the cosmological eras to the present time. The model present stability within the geometric and matter perturbations for the choice Fg=y, where y=(T1/3/16π G)(16π GT+T+8), except for geometric part to de Sitter model. We impose the first and second laws of thermodynamics to the and find the condition where they are satisfied, that is, TA,Geff>0, however where this is not possible for cases where we choose, leading to a breakdown of positive entropy and Misner-Sharp energy.